Abstract
In this paper, we have investigated spectral statistics in a quantum optical model, the condition for the random matrix theory is analysed and illustrated with numerical results.
Similar content being viewed by others
References
Gutzwiller, M.C.: Chaos in classical and quantum mechanics. New York: Springer 1990
Haake, F.: Quantum Signatures of Chaos. Berlin: Springer 1991
Reichl, L.E.: The transition to chaos: in conservative classical systems: quantum manifestations. Berlin: Springer 1992
Xu, G.O., Gong, J.B., Wang, W.G., Yang, Y.T., Fu, D.J.: Phys. Rev. E. March. (1995)
Mehta, M.L.: Random Matrices. New York: Academic Press 1967; Brody, T.A., Flores, J., French, J.B., Mello, P.A., Pandey, A., Wong, S.S.M.: Rev. Mod. Phys.53, 385 (1981)
Robnik, M., Berry, M.V.: J. Phys. A: Math. Gen.19, 669 (1981); Yukawa, T., Ishikawa, T.: Progr. Theor. Phys. Suppl.98, 157 (1989)
Allen, L., Eberly, J.H.: Optical Resonance and Two-level Atoms. New York: Wiley 1975; Jaynes, E.T., Cummings, F.W.: Proc. IEEE51, 126 (1963)
Graham, R., Höhnerbach, M.: Phys. Lett. A101, 61 (1984); Z. Phys. B57, 233 (1984)
Belobrov, P.I., Zaslavskii, G.M., Tartaovski, G. Kh.: Sov. Phys. JETP44, 945 (1976); Milonni, P.W., Ackerhalt, J.R., Galbraith, H.W.: Phys. Rev. Lett.50, 966 (1983)
Ku, M.: Phys. Rev. Lett.54, 1343 (1985)
Graham, R., Höhnerbach M.: Phys. Rev. Lett.57, 1378 (1986); In: Quantum Measurement and Chaos, Pike, E.R., Sarker, S.: (eds.) NATO ASI Series B, Physics, vol. 161, p. 147 New York: Plenum Press 1987